Title :
Convergence of generalized fuzzy bidirectional associative memory neural networks with thresholds
Author :
Guiying Chen ; Linshan Wang
Author_Institution :
Sch. of Math. & Sci., Ocean Univ. of China, Qingdao, China
Abstract :
Based on the fuzzy operator “ν” and a t-norm T, a generalized dynamical model named the fuzzy bidirectional associative memory neural networks (ν -T FBAMs) with thresholds is set up. It shows that every equilibrium of the system is Lyapunov stable if T satisfies Lipschitz condition. It is proved that the existence of the indices of the matrix U, which is the product of the system connection fuzzy matrices, is sufficient condition for the system to be strongly convergent, and the convergence in finite steps of U is sufficient condition for the system to be strongly stable in finite steps. Also we give some stable states and equilibriums of the system by the standard eigenvectors of U.
Keywords :
Lyapunov methods; content-addressable storage; fuzzy neural nets; fuzzy set theory; matrix algebra; Lipschitz condition; eigenvectors; fuzzy matrices; fuzzy operator; generalized dynamical model; generalized fuzzy bidirectional associative memory neural networks; sufficient condition; t-norm; Associative memory; Convergence; Indexes; Neural networks; Stability criteria; Sufficient conditions; ∨ -T FBAMs; Lyapunov stability; equilibrium; stable state; strongly convergent; strongly stable; threshold;
Conference_Titel :
Fuzzy Systems and Knowledge Discovery (FSKD), 2013 10th International Conference on
Conference_Location :
Shenyang
DOI :
10.1109/FSKD.2013.6816164
